A scalar field equation on hyperbolic space with indefinite sign nonlinearity

Abstract

In this article, we study threshold phenomena for the semilinear double-power elliptic equation -BN u - λ u = |u|p-1u - |u|q-1u, u ∈ H1(BN), on the hyperbolic space BN for N 3. For parameters 1 < p 2*-1 (though we occasionally allow for supercritical exponents) and q > 0, we seek to identify the optimal spectral regimes for λ ∈ R that delineate the existence and non-existence of positive-energy solutions. We achieve a complete resolution of these thresholds across all exponent configurations: p < q, 0 < q < 1 < p, and 1 < q < p. Our results demonstrate that the boundary separating these regimes is governed by an explicit critical spectral parameter, which depends on p, q, and N in the regime where p < q, but depends solely on N in the remaining cases.